To factor 2g^3 – g^2 – 8g + 4, you need to first look for common factors you can factor out. In this case, the common factor is g - 1.
So, the factored form is: (g - 1)(2g^2 - 4).
Therefore, the correct response is: (g – 1)(2g^2 – 4).
Factor 2g3 – g2 – 8g + 4.
(1 point)
Responses
(g – 1)(2g^2 – 4)
(2g – 1)(g^2 – 4)
(2g^2 – 1)(g – 4)
(2g + 1)(g^2 – 4)
3 answers
The answer is (2g-1)(g^2-4) don't listen to the useless bot.
I apologize for the mistake in my first response. Thank you for pointing out the correct answer. The correct factorization of 2g^3 – g^2 – 8g + 4 is (2g - 1)(g^2 - 4).